Carpathian Mathematical Publications
Published by Precarpathian National University
ISSN : 2075-9827 eISSN : 2313-0210
Abbreviation : Carpathian Math. Publ.
Aims & Scope
"Carpathian Mathematical Publications" is a scientific mathematical journal, which is published in Ivano-Frankivsk, Ukraine.
The journal was founded by Vasyl Stefanyk Precarpathian National University in 2008 and is published with support and assistance of Ivano-Frankivsk mathematical society.
The journal publishes overview, problem-based, and original research articles in all areas of mathematics, including, but not limited to, mathematical analysis, topology, algebra, discrete mathematics, computational mathematics, differential equations, and mathematical physics.
Due to the Russian military invasion of Ukraine, the review process has become much longer.
Many reviewers are currently defending our country from the occupiers.
This causes inconvenience to many authors.
But Ukraine will win and "Carpathian Mathematical Publications" will work at full capacity again and will have a higher impact!
Accordingly, the journal “Carpathian Mathematical Publications†temporarily does not accept manuscripts from Russian-affiliated authors, as research results in Mathematics can often have a dual purpose and be used for military purposes.
View Aims & ScopeMetrics & Ranking
Impact Factor
| Year | Value |
|---|---|
| 2025 | 1 |
| 2024 | 1.00 |
SJR (SCImago Journal Rank)
| Year | Value |
|---|---|
| 2024 | 0.695 |
Quartile
| Year | Value |
|---|---|
| 2024 | Q1 |
h-index
| Year | Value |
|---|---|
| 2024 | 16 |
Journal Rank
| Year | Value |
|---|---|
| 2024 | 8166 |
Journal Citation Indicator
| Year | Value |
|---|---|
| 2024 | 256 |
Impact Factor Trend
Abstracting & Indexing
Journal is indexed in leading academic databases, ensuring global visibility and accessibility of our peer-reviewed research.
Subjects & Keywords
Journal’s research areas, covering key disciplines and specialized sub-topics in Mathematics, designed to support cutting-edge academic discovery.
Licensing & Copyright
This journal operates under an Open Access model. Articles are freely accessible to the public immediately upon publication. The content is licensed under a Creative Commons Attribution 4.0 International License (CC BY 4.0), allowing users to share and adapt the work with proper attribution.
Copyright remains with the author(s), and no permission is required for non-commercial use, provided the original source is cited.
Policy Links
This section provides access to essential policy documents, guidelines, and resources related to the journal’s publication and submission processes.
- Aims scope
- Homepage
- Oa statement
- Author instructions
- License terms
- Review url
- Board url
- Copyright url
- Preservation url
- Apc url
- License
APC Details
The journal’s Article Processing Charge (APC) policies support open access publishing in Mathematics, ensuring accessibility and quality in research dissemination.
This journal does not charge a mandatory Article Processing Charge (APC). However, optional open access publication may incur fees based on the publisher’s policies.
Explore journals without APCs for alternative publishing options.
Most Cited Articles
The Most Cited Articles section features the journal's most impactful research, based on citation counts. These articles have been referenced frequently by other researchers, indicating their significant contribution to their respective fields.
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On approximation of functions from the class $L^{\psi}_{\beta, 1}$ by the Abel-Poisson integrals in the integral metric
Citation: 30
Authors: T.V., Yu.I.
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A solution of the fractional differential equations in the setting of $b$-metric space
Citation: 29
Authors: H., E.
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Approximation properties of Abel-Poisson integrals on the classes of differentiable functions, defined by means of modulus of continuity
Citation: 29
Authors: T.A., Yu.I.
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Asymptotics of approximation of functions by conjugate Poisson integrals
Citation: 29
Authors: I.V., Yu.I., K.V.
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An efficient hybrid technique for the solution of fractional-order partial differential equations
Citation: 26
Authors: H.K., H., A., C.
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The use of the isometry of function spaces with different numbers of variables in the theory of approximation of functions
Citation: 25
Authors: D.M., F.G., I.V., M.
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Ricci soliton and Ricci almost soliton within the framework of Kenmotsu manifold
Citation: 23
Authors: A.
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Symmetric functions on spaces $\ell_p(\mathbb{{R}}^n)$ and $\ell_p(\mathbb{{C}}^n)$
Citation: 18
Authors: T.V.
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Approximation of functions of several variables by multidimensional $S$-fractions with independent variables
Citation: 17
Authors: R.I., S.V.